If you believe his resume, Johnson would be one of the town’s most famous citizens. But when asked about Bastrop’s biggest names, Mayor Arthur Jones mentions a few professional athletes: Bob “Butterbean” Love, Willie David Parker, Calvin Natt. No reference to Danny Ray Johnson.

Over at Bastrop High School, where Johnson graduated in 1979, a yearbook shows him sportingblond, feathered hair and a straight face. Voted neatest in his class, he was part of the school’s rock band and the history and journalism clubs.

Johnson’s parents, Jerry and Charlene, still live in Bastrop and still own theranch house where Johnson grew up.

“I don’t know what you want to hear. He’s been a good boy all his life, in church,” said Jerry Johnson, a retired manager at the now shuttered local paper mill who, like his son, sports a shock of gold hair, slicked back in a pompadour.

He and his wife are still close to their son
—
“as close as a phone call,” Jerry Johnson says
—
and they are surprised to hear reporters asking questions.

What was the young Pope like? How did he get his start preaching? Was he healed by a miracle?

Johnson has said his religious underpinnings go back to childhood and that, at age 7, he was cured of blindness. It was, by his account, a miracle.

But details of this miracle are spotty. There was an incident with a BB gun and a trip to the doctor, his parents said. It might have been his left eye, maybe his right eye. Maybe it was both.

What is clear is that this incident helped propel Johnson on a path towards God and the pulpit.

Lewis, a pastor of 50 years, saw promise in the young man with the golden hair. But one day, without explanation, Johnson vanished. He never returned to the church and Lewis, his mentor, has no idea why. He knows Johnson dreamed of a life beyond Bastrop.

“Danny always wanted to get out and mingle with the people, like a celebrity, he had dreams of doing something big,” Lewis said.

Just after midnight on Oct. 18, 1985,
police stumbled
on an abandoned 1982 Cadillac Coupe de Ville in Cox Park, next to the Ohio River. Two people ran away as police pulled up.

The car had been stripped of its tires and rims. It had been doused, inside and out, with gasoline. Someone had intended to set the Cadillac ablaze.

Investigators picked up the pair who ran away. Under questioning, they told police they planned to torch the vehicle. A preacher named Johnson had given them $200 to set the fire and told them they could keep the rims and tires as a bonus. He had moved to the city earlier that year and started working at a church just south of downtown.

A group is a top-level resource that represents a collection of users. A representation of a group will contain identifying information for the group (such as the group’s name), as well as representations of all the users in the group.

This documentation is for Cumulus Linux 3.5.3, which is an older version of the software. If you are using the current version of Cumulus Linux, this content may not be up to date. The current version of the documentation is available here:
Protocol Independent Multicast - PIM
. (If this link does not take you to the correct page, that page may have been renamed or deleted. Try navigating from the
main page
of the current documentation.)

Protocol Independent Multicast (PIM) is a multicast control plane protocol, that advertises multicast sources and receivers over a routed layer 3 network. Layer 3 multicast relies on PIM to advertise information about multicast capable routers and the location of multicast senders and receivers. For this reason, multicast cannot be sent through a routed network without PIM.

PIM has two modes of operation: Sparse Mode (PIM-SM) and Dense Mode (PIM-DM).

Cumulus Linux only supports PIM Sparse Mode.

This chapter covers ...

When PIM is configured on an interface,
PIM Hello
messages are sent to the link local multicast group 224.0.0.13. Any other router configured with PIM on the segment that hears the PIM Hello messages will build a PIM neighbor with the sending device.

PIM neighbors are stateless. No confirmation of neighbor relationship is exchanged between PIM endpoints.

PIM Sparse Mode (PIM-SM) is a "pull" multicast distribution method. This means that multicast traffic is only sent through the network if receivers explicitly ask for it. When a receiver "pulls" multicast traffic, the network must be periodically notified that the receiver wishes to continue the multicast stream.

This behavior is in contrast to PIM Dense Mode (PIM-DM), where traffic is flooded, and the network must be periodically notified that the receiver wishes to stop receiving the multicast stream.

Any-source Mulitcast (ASM) is the traditional, and most commonly deployed PIM implementation. ASM relies on rendezvous points to connect multicast senders and receivers that then dynamically determine the shortest path through the network between source and receiver, to efficiently send multicast traffic.

Bidirectional PIM (BiDir) forwards all traffic through the multicast rendezvous point (RP), rather than tracking multicast source IPs, allowing for greater scale, while resulting in inefficient forwarding of network traffic.

Source Specific Multicast (SSM) requires multicast receivers to know exactly which source they wish to receive multicast traffic from, rather than relying on multicast rendezvous points. SSM requires the use of IGMPv3 on the multicast clients.

X(10272) = midpoint of X(i) and X(j) for these {i,j}: {5,110}, {113,1511}, {125,5609} ,{549,5655}, {550,7728}, {6053,6 699} X(10272) = reflection of X(i) in X(j) for these (i,j): (125,3628), (140,5972), (10113, 3850) X(10272) = crossdifference of every pair of points on the line X(2081)(X(2433) X(10272) = complement of the complement of X(399) X(10272) = {X(i),X(j)}-harmonic conjugate of X(k) for these (i,j,k): (113,5642,1511), (5972,6053,6699)

In the plane of a triangle ABC, let I = X(1) = incenter, N = X(5) = nine-point center, A' = reflection of I in BC, and define B' and C' cyclically Na = X(5)-of-IBC, and define Nb and Nc cyclically Then X(10273) is the centroid of N1N2N3. See Antreas Hatzipolakis and Peter Moses,
24611
).

Let F
A
, F
B
, F
C
be the A-, B-, C- Feuerbach points of ABC, respectively (i.e., the touchpoints of the nine-points-circle and the excircles). Let F
D
=X(11) be the Feuerbach point of ABC. The cyclic quadrangle QA
F
={F
A
,F
B
,F
C
,F
D
} is here named the
Feuerbach quadrangle of ABC
. The centroid of QA
F
is X(10276).